Question

Question #f058d

Answer 1

`tan y =x^2/2`

Explanation:

This is a variable separable differential equation

`(dy)/dx=x cos^2 y`

`(dy)/cos^2 y=x* dx`

`sec^2 y" "dy=x* dx`

`int sec^2 y" "dy=int x* dx`

`tan y =x^2/2+C`

using `y=0` when `x=0`

`tan 0 =0^2/2+C`

`C=0`

final answer

`tan y =x^2/2+0`

`tan y =x^2/2`

God bless....I hope the explanation is useful.

Answer 2

The variables can be separated naturally:

`(dy)/(dx)=x cos^2(y) => (dy)/cos^2(y)=xdx`

Integrate both sides:

`int xdx = int (dy)/cos^2(y)`

`x^2/2 + C =tany`

For `x=0, tany|_(y=0) = C => C=0`

`y(x)=arctan(x^2/2)`